(C) $t_n$ is the number of triangles formed with $n$ points in a plane,where no three points are collinear. Thus,$t_n = {}^{n}C_3$. Given $t_{n+1} - t

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(C) $t_n$ is the number of triangles formed with $n$ points in a plane,where no three points are collinear. Thus,$t_n = {}^{n}C_3$. Given $t_{n+1} - t_n = 36$. Substituting the formula: ${}^{n+1}C_3 - {}^{n}C_3 = 36$. Using the property ${}^{n+1}C_r = {}^{n}C_r + {}^{n}C_{r-1}$,we have ${}^{n+1}C_3 - {}^{n}C_3 = {}^{n}C_2$. Therefore,${}^{n}C_2 = 36$. $\frac{n(n-1)}{2} = 36$. $n(n-1) = 72$. $n^2 - n - 72 = 0$. $(n-9)(n+8) = 0$. Since $n$ must be positive,$n = 9$.

Class 11 Mathematics Permutation and Combination Geometrical problems

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If $t_n$ denotes the number of triangles formed with $n$ points in a plane,no three of which are collinear,and if $t_{n+1}-t_n=36$,then $n$ is equal to

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If $t_n$ denotes the number of triangles formed with $n$ points in a plane,no three of which are collinear,and if $t_{n+1}-t_n=36$,then $n$ is equal to

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